Write Maxwell's four Thermodynamic Relations.
1. Maxwell's First Relation :
This relation links changes in pressure and temperature with respect to volume. It is given as:
\[ \left( \dfrac{\partial T}{\partial V} \right)_P = -\left( \dfrac{\partial P}{\partial V} \right)_T \]
This equation shows that the rate of change of temperature with respect to volume at constant pressure is equal to the negative rate of change of pressure with respect to volume at constant temperature.
2. Maxwell's Second Relation :
This relation connects changes in pressure and temperature with respect to entropy. It is expressed as:
\[ \left( \dfrac{\partial T}{\partial P} \right)_S = \left( \dfrac{\partial V}{\partial S} \right)_P \]
This equation indicates that the rate of change of temperature with respect to pressure at constant entropy is equal to the rate of change of volume with respect to entropy at constant pressure.
3. Maxwell's Third Relation :
This relation correlates changes in volume and temperature with respect to pressure. It is represented as:
\[ \left( \dfrac{\partial V}{\partial T} \right)_P = \left( \dfrac{\partial S}{\partial P} \right)_T \]
This equation demonstrates that the rate of change of volume with respect to temperature at constant pressure is equivalent to the rate of change of entropy with respect to pressure at constant temperature.
4. Maxwell's Fourth Relation :
This relation relates changes in volume and pressure with respect to temperature. It can be written as:
\[ \left( \dfrac{\partial V}{\partial P} \right)_T = -\left( \dfrac{\partial S}{\partial T} \right)_P \]
This equation shows that the rate of change of volume with respect to pressure at constant temperature is equal to the negative rate of change of entropy with respect to temperature at constant pressure.
These four Maxwell relations are essential in thermodynamics and can help in solving various problems and understanding the behaviour of systems under different conditions.
Good explanation.
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